Abstract
A graph is one-ended if it contains a ray (a one way infinite path) and whenever we remove a finite number of vertices from the graph then what remains has only one component which contains rays. A vertex v dominates a ray in the end if there are infinitely many paths connecting v to the ray such that any two of these paths have only the vertex v in common. We prove that if a one-ended graph contains no ray which is dominated by a vertex and no infinite family of pairwise disjoint rays, then it has a tree-decomposition such that the decomposition tree is one-ended and the tree-decomposition is invariant under the group of automorphisms. This can be applied to prove a conjecture of Halin from 2000 that the automorphism group of such a graph cannot be countably infinite and solves a recent problem of Boutin and Imrich. Furthermore, it implies that every transitive one-ended graph contains an infinite family of pairwise disjoint rays.
Originalsprache | englisch |
---|---|
Seiten (von - bis) | 524-539 |
Seitenumfang | 16 |
Fachzeitschrift | Mathematische Nachrichten |
Jahrgang | 292 |
Ausgabenummer | 3 |
DOIs | |
Publikationsstatus | Veröffentlicht - März 2019 |
ASJC Scopus subject areas
- Allgemeine Mathematik